# The multiplicative ideal theory of Leavitt path algebras of directed   graphs - a survey

**Authors:** Kulumani M Rangaswamy

arXiv: 1902.00774 · 2019-02-05

## TL;DR

This survey explores the ideal structure of Leavitt path algebras, highlighting their similarities to Dedekind and Prüfer domains, and details factorization properties and graphical characterizations of ideals.

## Contribution

It provides a comprehensive overview of the multiplicative ideal theory of Leavitt path algebras, including factorization, ideal types, and conditions for being a generalized ZPI ring.

## Key findings

- Existence of ideal factorizations into prime, primary, or irreducible ideals.
- Graphical conditions characterize various ideal types.
- Conditions for Leavitt path algebras to be generalized ZPI rings.

## Abstract

Let L be the Leavitt path algebra of an arbitrary directed graph E over a field K. This survey article describes how this highly non-commutative ring L shares a number of the characterizing properties of a Dedekind domain or a Pr\"ufer domain expressed in terms of their ideal lattices. Special types of ideals such as the prime, the primary, the irreducible and the radical ideals of L are described by means of the graphical properties of E. The existence and the uniqueness of the factorization of a non-zero ideal of L as an irredundant product of prime or primary or irreducible ideals is established. Such factorization always exists for every ideal in L if the graph E is finite or if L is two-sided artinian or two-sided noetherian. In all these factorizations, the graded ideals of L seem to play an important role. Necessary and sufficient conditions are given under which L is a generalized ZPI ring, that is, when every ideal of L is a product of prime ideals. Intersections of various special types of ideals are investigated and an anlogue of Krull's theorem on the intersection of powers of an ideal in L is established.

## Full text

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## References

23 references — full list in the complete paper: https://tomesphere.com/paper/1902.00774/full.md

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Source: https://tomesphere.com/paper/1902.00774